A class survey found that 29 students watched television on Monday, 24 on Tuesday, and 25 on Wednesday. Of those who watched TV on only one of these days, 13 choose Monday, 9 chose Tuesday, and 10 chose Wednesday. Every student watched TV on at least one of these days, and 12 students watched TV on all three days. If 14 students watched TV on both Monday and Tuesday, how many students were there in the class

Answer:There were 49 students in the classStep-by-step explanation:To solve this problem, we must build the Venn's Diagram of this set.I am going to say that:-The set A represents the students that watched TV on Monday-The set B represents the student that watched TV on Tuesday.-The set C represents the students that watched TV on Wednesday.We have that:[tex]A = a + (A \cap B) + (A \cap C) + (A \cap B \cap C)[/tex]In which a is the number of students that only watched TV on Monday, [tex]A \cap B[/tex] is the number of adults that watched TV both on Monday and Tuesday, [tex]A \cap C[/tex] is the number of students that watched TV both on Monday and Wednesday, and [tex]A \cap B \cap C[/tex] is the number of students that watched TV on every day.By the same logic, we have:[tex]B = b + (B \cap C) + (A \cap B) + (A \cap B \cap C)[/tex][tex]C = c + (A \cap C) + (B \cap C) + (A \cap B \cap C)[/tex]This diagram has the following subsets:[tex]a,b,c,(A \cap B), (A \cap C), (B \cap C), (A \cap B \cap C)[/tex]The sums of all of this values is the number of student that were there in the class. This means that we want to find the value of T:[tex]a + b + c + (A \cap B) + (A \cap C) + (B \cap C) + (A \cap B \cap C) = T[/tex]We start finding the values from the intersection of three sets.Solution:12 students watched TV on all three days:[tex]A \cap B \cap C = 12[/tex]14 students watched TV on both Monday and Tuesday[tex]A \cap B + A \cap B \cap C = 14[/tex][tex]A \cap B = 14 - 12[/tex][tex]A \cap B = 2[/tex]Of those who watched TV on only one of these days, 13 choose Monday, 9 chose Tuesday, and 10 chose Wednesday. [tex]a = 13, b = 9, c = 10[/tex]29 students watched television on Monday:[tex]A = 29[/tex][tex]A = a + (A \cap B) + (A \cap C) + (A \cap B \cap C)[/tex][tex]29 = 13 + 2 + (A \cap C) + 12[/tex][tex]A \cap C = 29 - 27[/tex][tex]A \cap C = 2[/tex]24 on Tuesday[tex]B = 24[/tex][tex]B = b + (B \cap C) + (A \cap B) + (A \cap B \cap C)[/tex][tex]24 = 9 + (B \cap C) + 2 + 12[/tex][tex]B \cap C = 24 - 23[/tex][tex]B \cap C = 1[/tex]Now we have every value needed to find T:[tex]T = a + b + c + (A \cap B) + (A \cap C) + (B \cap C) + (A \cap B \cap C)[/tex][tex]T = 13 + 9 + 10 + 2 + 2 + 1 + 12[/tex][tex]T = 49[/tex]There were 49 students in the class